Every integer is a rational number but every rational number need not be an integer. View Solution Every natural number is a rational number but a rational number need not be a natural number View Solution Every fraction is a rational number but a rational number need not be a fraction. Vie...
To solve the question "Every rational number is also a...", we need to analyze the options provided and understand the definitions of the terms involved.1. Understanding Rational Numbers: - A rational number is defined as an
The meaning of RATIONAL NUMBER is a number that can be expressed as an integer or the quotient of an integer divided by a nonzero integer.
Every integer is a rational number.An integer is a whole number, whether positive or negative, including zero. A rational number is any number that is able to be expressed by the term a/b, where both a and b are integers and b is not equal to zero. While true that all integers are...
百度试题 结果1 题目Rational Number that canbe classified as an Integer 相关知识点: 试题来源: 解析 AMVCl_2=A/2 反馈 收藏
1)Whichnumberisarationalnumberbutnotaninteger? a)–6 b)0 c)⅝ d)none 2)Whichnumberisanintegerbutnotanaturalnumber? a)π b)-¾ c)0 d)none 3)Whichnumberisaninteger,butnotrational? a) π b)4 c)-.25 d)none 4)Whichnumberiswhole,butnotnatural? a)0 b)4 c).75 d)none 5)Which...
Is an irrational number divided by a rational number irrational? Can a number be both irrational and an integer? a. Yes b. No c. Sometimes If a number is not a rational number then it is... 1. an integer? 2. an irrational number? 3. a whole number? 4. a radical?
The answer to this question is false; a rational number is a quotient, but not of any two integers, because we have one restriction. The definition of... Learn more about this topic: Rational Numbers | Definition, Forms & Examples
54 D.Rational number where q=0 A.is greater than B.is less than C.is equal to 3、The product of two rational numbers is always a/an ___. D.The comparison is not possible. A.Rational number B.Irrational number 4、Which one is a rational number between 1 and 1 ___...
证明对于每一个有理数a,都有一个最小的正整数n可以让na是一个整数原题:Prove that for every rational number a,there is a smallest positive integer n such that na is an integer(use the fact that any nonempty set of positive